MathDB

$p_{n+2}$ is the largest prime divisor of $p_n+p_{n+1}+2018$

Source: IMOC 2019 N4

September 4, 2020

number theoryIMOC

Problem Statement

Given a sequence of prime numbers

p_1, p_2,\cdots

, with the following property:

p_{n+2}

is the largest prime divisor of

p_n+p_{n+1}+2018

Show that the set

\{p_i\}_{i\in \mathbb{N}}

is finite.